Chapter 2 Trigonometry

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1 Foundations of Math 11 Chapter 2 Note Package Chapter 2 Lesson 1 Review (No Practice Questions for this Lesson) Page 1 The Beauty of Triangles (No Notes for this Page) Page 2 Pythagoras Review (No Notes for this Page) Page 3 SOH CAH TOA Review Lesson 2 Sine Law 1 Page 1 Oblique Triangles Page 2 Sine Law Exploration Page 3 Sine Law Explained Page 4 Sine Law Saves Lives Lesson 3 Sine Law 2 Page 1 Why SSA Doesn t Always Work Page 2 More SSA Explanation Page 3 How Many Triangles? Page 4 Finding Both Triangles Lesson 4 Cosine Law Page 1 Why do We Need Another Law? Page 2 Cooking up the Cosine Law Page 3 Cosine Law Saves Lives Page 4 Solving Triangles: What to use When

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5 Lesson 2 Sine Law 1 Answer the questions below. 1. Challenge# Find the length of side x. 2. Challenge# Find the measure of angle.

6 The Sine Law When a triangle is oblique (no right angles), you cannot use the primary trigonometric ratios: (SOH CAH TOA) However from these ratios we can derive another tool the Sine Law. 3. Consider Triangle ABC on the right. Follow the exploration below and show your work on the right Exploration Work space Label the sides of the triangle a b c opposite their corresponding angles. Draw a perpendicular down from B to AC and label it h. Write an expression for using c and h. Write an expression for using c and h. Rearrange each expression above to isolate h. Substitute one expression into the other and in doing so eliminate h. Divide both sides by ac to produce two-thirds of the Sine Law. The Sine Law 4. Rearrange the formula to isolate. 5. Rearrange the formula to isolate. 6. Once you have isolated, how do you find angle B?

7 The Sine Law or Use to find unknown sides and angles if you have Two angles and one opposing side. Two sides and one opposing angle. Solve using proportional reasoning (cross-multiply). Find the length of the indicated side. Answer to the nearest tenth when necessary. 7. Find the length of side x. 8. Find the length of side x. Use the Sine Law Fill in the 3 part you know. Cross-multiply.. Isolate x. 9. Find the length of side x. 10. Find the length of side G.

8 Use the Sine Law to answer the following questions. 11. In Triangle,. Solve the triangle. Diagram 12. In Triangle, Solve the triangle.. Diagram 13. Find the area of the following triangle to the nearest cm Find the area of the following triangle to the nearest square foot.

9 Find the missing angles. 15. Find the measure of angle. Answer to the nearest degree. 16. Find the measure of angle. Answer to the nearest degree. Use the Sine Law... Fill in what you know... Cross-multiply... Isolate.. Use the inverse sin function. 17. Find the measure of angle. Answer to the nearest degree. 18. Find the measure of angle. Answer to the nearest degree. 19. Sketch and solve the triangle. Answer to the nearest unit. 20. Sketch and solve the triangle. Answer to the nearest unit.

10 Use the Sine Law and any other tools necessary to solve the following problems. 21. Two fires are located 375 m apart on the bank of a river. A firefighter is walking 22. Player A passed the puck 7 m to player B who then passed the puck 4 m to player C who then redirected along the river at point C. Find the the puck back to player A at an angle of. What is the shortest distance across the river for her measure of the angle at player A to the nearest degree? to the nearest metre. 23. From across a river, Calla measures the angle of elevation to a large Sequoia tree to be. She then paces directly away from the tree 150 feet and measures the angle to be. How tall is the tree to the nearest foot? 24. A custom shelf is to be made with three parallel shelves and a parallelogram cross-brace. The angle between the shelves and brace is. The length of MQ is 28 cm and the length of RMis 30 cm. Find the length RQ. 25. Challenge# Draw 2 different triangles with the following measures.

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13 Lesson 3 Sine Law 2 Answer the questions below. Draw 2 different triangles with the following measures. Notice that has swung to the left at. have all remained unchanged. As you have seen previously in this chapter, supplementary angles have the same sine ratios. Notice that the angles labeled B in the above examples are supplementary. 1. Calculate:. 3. Calculate:. 2. Calculate:. 4. Calculate:. Since supplementary angles have the same sine ratio, it only stands to reason that dividing both by 20 also produces the same result. This produces ambiguity in certain cases of the Sine Law. If you are given an SSA case (2 sides and one angle), there could be one, more than one, or possibly no triangles. Below is triangle where side a could be placed in two different orientations.

14 This demonstrates the ambiguous case. Angle A, side and side are all unchanged in length or measure. How many triangles can you create above if What is the sine ratio for written in terms of and? 9. Use your ratio in the previous question to write an expression for. 10. Write a set of rules for determining how many triangles can be formed if you are given 2 sides and one opposite angle. 11. What would happen if side x was less than h. 12. How many triangles would be possible if side x was 51 mm long.

15 How many different triangles can be drawn given the following measurements? In Diagram: Proof: Since, there is the possibility for 2 triangles, however also. If you were to swing side past towards (circular path on diagram), the triangle would not form. Only One Triangle How many different triangles can be drawn given the following measurements? 13. In 14. In Diagram: Diagram: Proof: Proof:

16 15. How many triangles can be formed? 16. How many triangles can be formed? 17. How many triangles can be formed? Proof:, No triangle. Proof: Proof: 18. How many triangles can be formed? 19. How many triangles can be formed? 20. How many triangles can be formed? Proof: Proof: Proof: 21. Draw a triangle with the following measurements. Then solve the triangle if possible. 22. Draw a triangle with the following measurements. Then solve the triangle if possible. 23. Given two sides and one opposite obtuse angle, when can a triangle be formed? 24. Given two sides and one opposite obtuse angle, when can a triangle NOT be formed?

17 Use the diagram below to answer the questions to the right. 25. For the triangle on the left what value(s) of a would produce one right triangle? 26. For the triangle on the left what value(s) of a would result in two unique triangles? 27. For the triangle on the left what value(s) of a would produce no triangles? 28. For the triangle on the left what value(s) of a would produce one obtuse triangle? 29. Challenge Find the length of side x. 30. Challenge Find the measure of.

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20 Lesson 4 Cosine Law Answer the questions below. Sometimes we encounter problems where we can t use the primary trigonometric ratios or The Sine Law. We need another tool Triangle ABC is an oblique triangle (no right angle). If we draw an altitude from B to point D, we create two right triangles. To create the Cosine Law, we need to label all the parts to our diagram and consider the Pythagorean Theorem for both In Triangle ABD we see: In Triangle BCD we see: ( ) and We can use the equations above to derive the Cosine Law ( ) ( ) ( ) ( ) 1. What happened from the first line to the second line of the proof? 2. What happened from the fourth line to the fifth line of the proof?

21 The Cosine Law 3. What patterns do you see in the three statements of the Cosine Law? For use with non-right triangles when you know: 2 sides and the angle between them. or All 3 sides. 4. From the statement: 5. When do you feel the formula you created on the left will be useful? Rearrange the formula to isolate. 6. When must you use the Cosine Law instead of the Sine Law? Find the missing side length. Round to the nearest tenth when necessary. 7. Find the length of side x. 8. Solve for side d.

22 Find the indicated side length. Round to the nearest tenth when necessary. 9. Find the length of side x. 10. Find the length of side b. 11. Find the length of side BC. 12. Find the length of side x. 13. Find the length of side x. 14. Find the length of side a.

23 Find the indicated angle. Round to the nearest tenth when necessary. 15. Find the measure of 16. Find the measure of. rearrange cosine law to isolate CosC Fill in what we know. ( )( ) Calculate CosC. Inverse cosine (Cos -1 ). 17. Find the measure of. 18. Find the measure of. 19. Find the measure of. 20. Find the measure of.

24 Solve the following triangles. Answer to the nearest whole unit. 21. In Diagram: 22. In.. Diagram: 23. In Diagram:

25 True Bearing An object s relative position in relation to true north. We say the line pointing to the north pole is. From the origin, Point A is on a bearing of. 24. Estimate the bearing of the path through B. 25. Estimate the bearing of the path through C. 26. Estimate the bearing of the path through D. 27. From the 16 th tee at Cordova Bay, Tucker drives his ball 280 yards at a bearing of. Todd drives his ball at 295 yards at a bearing of. How far apart are the two golf balls to the nearest yard? 28. The Findlay Charles sailed at an average speed of 17 knots on a bearing of. Leaving from the same port the Jack Spot travelled on average at 21 knots on a bearing of. How far apart were they after one hour to the nearest kilometre? 29. Two ferets are released from the same point on a field at exactly 1:00 pm. One feret scurries 5 m/s on a bearing of 50. The other scampers at a speed of 6 m/s on a bearing of 220. How far apart are they apart at exactly 1:02 pm? 30. Two students are located at the centre of the rugby field in front of the school. One student leaves at 3.2 m/s on a bearing of 150. The other leaves at 220 at a speed of 4.3 m/s. How far apart are they after 10 seconds?

26 31. Leaving from base camp, a hiker travels on a bearing of at a speed of 15 km/h. After 3 hours, she changes her bearing to and travels at 12 km/h for 2 hours. How far is she from base camp at this time? 32. Two pool balls on a table are 12 cm apart. A third ball (A) is positioned as shown below. What range of angles can the ball be be shot to ensure it passes between the two balls. At many sporting events, an instument called a total station measures horizontal throwing distance in events such as discus and javelin. The onboard computer calculates distance using the formula, where D = distance thrown b = distance to impact from total station c = distance to centre of throwing circle R = radius of throwing circle = central angle between impact and centre of circle. 33. Total Station readings: Throwing circle radius is 1.25 m Distance to impact is 77.3 m. Distance to Centre of circle is 60.7 m. Central angle is. 34. Total Station readings: Throwing circle radius is 1.25 m Distance to impact is 78.2 m. Distance to Centre of circle is 60.7 m. Central angle is. Calculate distance thrown (nearest tenth): Calculate distance thrown (nearest tenth):

27 In each of the following questions, what is the most effective way to solve for the unkown? a) Pythagoras Theorem b) Primary Trigonometric ratios c) Sine Law d) Cosine Law Why? a) Pythagoras Theorem b) Primary Trigonometric ratios c) Sine Law d) Cosine Law Why? a) Pythagoras Theorem b) Primary Trigonometric ratios c) Sine Law d) Cosine Law Why? a) Pythagoras Theorem b) Primary Trigonometric ratios c) Sine Law d) Cosine Law Why?

28 a) Pythagoras Theorem b) Primary Trigonometric ratios c) Sine Law d) Cosine Law Why? a) Pythagoras Theorem b) Primary Trigonometric ratios c) Sine Law d) Cosine Law Why? 41. The Tower of Pisa in Italy leans to one side. Marj paces 90 metres from the base of the tower and looks up at the high side of the tower at degrees. She knows that this side has a length of metres. Find the angle that the tower leans at. Answer to the tenth of a degree. 42. A spotlight above a manufacturing plant floor produces a beam of light that has a beam angle of. Find the area of the illuminated region if the light projects a circle on the floor. Answer to the nearest square metre.

29 43. An aircraft flying towards a radio tower measures the angle of depression to the tower at. The pilot travels at the same bearing and altitude for 1200m and measures the angle to the tower to be. How far must the pilot fly to be directly above the tower? 44. Ferguson spots an eagle s nest in a tree in his backyard. He looks up at an angle of, walks 20 metres closer to the tree and looks up at an angle of to the nest. How high is the nest in the tree?

30 Practice Question Answers Lesson mm 2. 3., Inverse sine function mm (on page) m km m cm square feet If: : 2 triangles : one right triangle : one triangle : no triangles 11. There would not be a triangle formed triangles would result. 13. No triangle triangles. 15. No triangle triangles. 17. One triangle. 18. No triangle. 19. One triangle. 20. One triangle A triangle is not possible with these dimensions. 23. If the opposite side is longer than the other known side an obtuse triangle can be formed. 24. If the opposite side is shorter than the other given side, an obtuse triangle is not possible m feet cm 25. Answered on next page. Lesson One triangle 6. One or two. If there will be only one. 7. No triangles cm (rounded) Lesson 4 1. The binomial was expanded. 2. Expressions from triangle ABD above were substituted into the equation. 3. The isolated variable corresponds to the angle used on the right side of the equation. 4. or 5. When you need to find an angle.

31 6. The Sine Law requires you have a side and its opposite angle. The Cosine Law does not. If you have 3 sides or 2 sides and the angle between them use the Cosine Law mm m cm miles mm km yards km m m km 32. The ball can be shot at a range of m m 35. Cosine Law. Given two sides and the contained angle. 36. Sine Law. Given a side and opposite angle. 37. Sine Law. Given a side and opposite angle. 38. Primary Trig ratio. Right triangle, given an acute angle and one side. 39. Primary Trig ratio. Right triangle, given an acute angle and one side. 40. Sine Law. Given a side and opposite angle degrees to vertical m m m

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